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Action Potential Initiation in the Hodgkin-Huxley Model
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Citation
Colwell, Lucy J. and Michael P. Brenner. 2009. Action potential
initiation in the Hodgkin-Huxley Model. PLoS Computational
Biololgy 5(1): e1000265.
Published Version
doi:10.1371/journal.pcbi.1000265
Accessed
June 18, 2017 3:43:17 PM EDT
Citable Link
http://nrs.harvard.edu/urn-3:HUL.InstRepos:2757252
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This article was downloaded from Harvard University's DASH
repository, and is made available under the terms and conditions
applicable to Open Access Policy Articles, as set forth at
http://nrs.harvard.edu/urn-3:HUL.InstRepos:dash.current.termsof-use#OAP
(Article begins on next page)
Action Potential Initiation in the Hodgkin-Huxley Model
Lucy J. Colwell and Michael P. Brenner
School of Engineering and Applied Science,
Harvard University, Cambridge, MA 02138
Abstract
A recent paper of B. Naundorf et. al., described an intriguing negative correlation between
variability of the onset potential at which an action potential occurs (the onset span) and the
rapidity of action potential initiation (the onset rapidity). This correlation was demonstrated
in numerical simulations of the Hodgkin-Huxley model. Due to this antagonism, it is argued
that Hodgkin-Huxley type models are unable to explain action potential initiation observed in
cortical neurons in vivo or in vitro. Here we apply a method from theoretical physics to derive an
analytical characterization of this problem. We analytically compute the probability distribution
of onset potentials and analytically derive the inverse relationship between onset span and onset
rapidity. We find that the relationship between onset span and onset rapidity depends on the level
of synaptic background activity. Hence we are able to elucidate the regions of parameter space for
which the Hodgkin-Huxley model is able to accurately describe the behavior of this system.
1
A.
Author Summary
In 1952 Hodgkin and Huxley wrote down a simple set of equations that described an action
potential in terms of the opening and closing of voltage gated ion channels. Application of
this model to action potentials propagated in cortical neurons in vivo or in vitro, where
cortical neurons form large, densely-connected networks, requires the addition of equations
that describe synaptic background activity. These equations describe the ’noise’ that occurs
in the network - small voltage fluctuations which are amplified by ion channels and result
in spontaneous neuronal firing.
A recent paper suggests that the Hodgkin-Huxley model, with synaptic background activity, is simply not capable of modeling action potentials recorded in the cortical neurons
of cats. Consequently they suggest that to model their data it is necessary to conclude that
ion channels open cooperatively. Here we apply a method from theoretical physics to derive
a formula relating the experimentally observed quantities. The results suggest that the key
parameter depends on the amount of synaptic background activity incorporated into the
model.
B.
Introduction
In 1952, Hodgkin and Huxley explained how action potentials are generated through the
electrical excitability of neuronal membranes [1]. Action potentials arise from the synergistic
action of sodium channels and potassium channels, each of which opens and closes in a voltage dependent fashion. A key feature of their model is that the channels open independently
of each other; the probability that a channel is open depends only on the membrane voltage
history.
A recent paper [2] challenged this picture. Therein the dynamics of action potential
initiation in cortical neurons in vivo and in vitro are analyzed. The authors focus on two
variables, the onset potential, i.e. the membrane potential at which an action potential
fires, and the onset rapidity, or rate with which the action potential initially fires. Naundorf
et. al. argue that the variability or span of onset potentials observed in experiments,
in conjunction with their swift onset rapidity, cannot be explained by the Hodgkin-Huxley
model. In particular, within the Hodgkin-Huxley model they demonstrate through numerical
2
simulations an antagonistic relationship between these two variables. If parameters are
adjusted to fit the onset rapidity of the data, the observed onset span disagrees with the
model, and vice versa. To fix this discrepancy [2] argues for a radical rethinking of the basic
underpinnings of the Hodgkin and Huxley model, in which the probability of an ion channel
being open depends not only on the membrane potential but also on the local density of
channels.
The result reported in [2] was critically analyzed in a recent letter of D. A. McCormick et.
al. [3]. In [3] it was proposed that the observed combination of large onset span and swift
onset rapidity could be captured using a Hodgkin-Huxley model if action potentials were
initiated at one place within the cell, (the axon initial segment), and then propagated around
30 microns to the site at which they were recorded, (the soma). Whole-cell recordings from
the soma of cortical pyramidal cells in vitro demonstrated faster onset rapidity and larger
onset span then those obtained from the axon initial segment. This seemingly compelling
reappraisal of the original data was in turn dissected by Naundorf et. al. in [4] where it is
suggested that the physiological setting of [3] is unrealistic, and the model inadequate.
Here we use a standard technique from theoretical physics (the path integral) to derive
an analytical formula relating the onset rapidity and onset span. Our analysis applies to
the classical Hodgkin-Huxley model, in addition to generalizations thereof, including those
in which the channel opening probability depends on channel density [2]. To derive an analytical characterization of this relationship, we directly compute the probability distribution
of the onset potential and demonstrate how it depends on model parameters. The formula
that we arrive at can be used to compare experimental observations with the parameter
values incorporated into such models. As anticipated by [2], a broad class of ion channel
models displays an inverse relationship between onset rapidity and onset span. We find
that the parameter relating onset rapidity to onset span depends on the amount of synaptic
background activity included in the model. Indeed, a range of background activity exists
where the classical Hodgkin-Huxley model agrees with the experimental data reported in
[2].
3
C.
Materials and Model
We first review the essential framework of Hodgkin-Huxley type models for action potential generation. The dynamics of the membrane potential V of a section of neuron, assumed
to be spatially homogeneous, are given by [1]:
Cm
1
dV
= −IN a − IK − IM − gL (V − EL ) + Isyn ,
dt
A
(1)
where
IN a = ḡN a PN a (V, t)(V − EN a ),
IK = ḡKd PKd (V, t)(V − EK ),
IM = ḡM PM (V, t)(V − EK )
Here Cm is the membrane capacitance, ḡX is the maximal conductance of channels of type X,
PX is the probability that a channel of type X is open, EX is the reversal potential for channel
type X and the subscripts N a, K and M refer to sodium, potassium and M-type potassium
channels respectively. A leak current is included with conductance gL and reversal potential
EL , A is the membrane area, while Isyn is the current resulting from synaptic background
activity [5]. Background activity is typically modeled by assuming synaptic conductances
are stochastic and consists of an excitatory conductance (ge ) with reversal potential Ee and
an inhibitory conductance (gI ) with reversal potential EI , as found in [6] so that
Isyn = ge (t)(V − Ee ) + gI (t)(V − EI ).
(2)
In [2] the conductances ge (t) and gI (t) are modeled by Ornstein-Uhlenbeck processes with
correlation times τe and τI , and noise diffusion coefficients De and DI respectively [7].
We are interested in understanding from this model the relationship between onset span
and onset rapidity, as defined by [2]. As described above, the onset rapidity is the rate at
which the voltage increases; near onset the increase in voltage is exponential and so is given
by the slope of a plot of dV /dt versus V . The onset span measures the variability of the
voltage threshold for action potential initiation, [2] defines this threshold as the voltage at
which dV /dt = σ, and takes σ = 10mVms−1 . Due to the stochastic synaptic background,
there is a distribution of voltages at which the voltage threshold is attained; the onset span is
given by the width of this distribution. We calculate the probability distribution of voltage
thresholds, and derive the onset span from the moments of this distribution.
4
D.
Results and Discussion
To proceed we use the fact that, at action potential initiation, we need only consider
the sodium channels. This is because the potassium channels respond too slowly for their
dynamics to influence the voltage V [8]. Moreover, near threshold, the probability that
a sodium channel is open depends only on the membrane voltage V . This probability is
traditionally measured by the so-called activation curve [9], where PN a (V, t) = PN a (V ).
Under these assumptions, Eq. (1) reduces to
Cm
1
dV
= −ḡN a PN a (V )(V − EN a ) − (ḡKd + ḡM )(V − EK ) − gL (V − EL ) − Isyn .
dt
A
(3)
Action potential onset occurs when V reaches V ∗ , where V ∗ is an unstable equilibrium of
Eq.(3) in the absence of noise. Below V ∗ the membrane potential relaxes to its resting
potential, whereas above V ∗ an action potential fires. To study the dynamics near onset,
we therefore write V = V ∗ + x, and expand equation (3) to leading order in x, obtaining
dx
= ax + η(t),
dt
(4)
where
1
dPN a (V ∗ ) ∗
∗
a=−
(V − EN a ) + ḡN a P (V ) + (ḡKd + ḡM + gL ) ,
ḡN a
Cm
dV
and
1
1
∗
∗
∗
η(t) = −
Isyn (V + x) =
ge (t)(V + x − Ee ) + gI (t)(V + x − EI ) .
ACm
ACm
We use the parameter values Ee = 0mV and EI = −75mV as found in [6] and used in [2].
Thus η(t) =
1
[(ge (t)
ACm
+ gI (t))(V ∗ ) + 75gI (t)]. Near threshold the synaptic background
itself is a single gaussian noise source with diffusion constant characterized by
1
2
∗ 2
D = 2 2 75 DI + (V ) (DI + De ) .
A Cm
Note that in equation (4), a is the onset rapidity. According to [2],the voltage threshold
is defined as the voltage at which ẋ = σ, where ẋ denotes the time derivative of x. Owing
to the noise source η there is a range of x values at which this condition is attained. The
onset span describes the range observed, and is related to the standard deviation of the
probability distribution for these voltage thresholds.
5
Consider trajectories x(t) subject to the boundary conditions x(0) = 0 and ẋ(T ) = σ,
where T is the time at which the voltage threshold is attained. There is a distribution of
times T at which the threshold condition can be met. Moreover, for a given T , there is a
distribution of voltages x(T ) that the trajectory might attain at time T . This distribution
is characterized by a mean x∗ (T ), as well as a variance δx(T )2 . The total variance of the
voltage threshold is therefore given by
Z
2 Z
Z
2
2
S = P (T )x(T ) dT −
P (T )x(T ) dT + P (T )E[δx(T )2 ]dT,
(5)
where P (T ) is the probability that the voltage threshold occurs at time T , and E(−) denotes
the expectation. The first two terms of equation (5) make up the variance of mean values
x∗ (T ) that occur owing to the range of times T at which the threshold condition is met.
For each such time T , the final term sums the variance of voltages x(T ) likely to be reached
about the mean value x∗ (T ).
Equation (5) is the fundamental equation for the onset span: it requires us to compute
x∗ (T ), P (T ) and δx(T ). To proceed, we use the fact that the noise source η(t) is Gaussian
with variance D, and therefore the probability density Q[η] of a given realization η of the
noise between 0 ≤ t ≤ T is
1
Q[η] ∝ exp −
2D
Z
T
η(s) ds .
2
0
This leads to a path integral formulation of the probability of realizing a particular trajectory
x(t) with 0 ≤ t ≤ T , as developed in [10]. As equation (4) implies η =
"
2 #
Z
Z T
1
dx
Q[x] ∝ exp −
− ax dt Dx(t).
2D 0
dt
dx
dt
− ax, we find
(6)
Here the integral is taken over all the possible paths that x(t) might take between time
t = 0 and t = T . Some paths are of course more likely then others; application of the
Euler-Lagrange equation finds that the most probable trajectory x∗ of Eq. (6) is the saddle
point. It minimizes
Z
0
T
dx
− ax
dt
2
dt,
subject to the boundary conditions x(0) = 0 and ẋ(T ) = σ and therefore satisfies
ẍ − a2 x = 0.
6
The most probable trajectory is the minimum of this quantity by definition. Since the
R
probability density is of the form e−M , where M ∼ (ẋ − ax)2 is positive definite, the
trajectory that minimizes M maximizes the probability. Imposing the boundary conditions
we have
x∗ (t) =
σ sinh at
.
a cosh aT
(7)
We can use insert this solution into Eq. (6), in order to compute the probability density of
this trajectory occurring. We obtain
σ2
C0
−2aT
exp
(e
− 1)
Q[x∗ ] = √
4aD cosh2 aT
2πD
It is convenient to rewrite this formula by defining the dimensionless parameters λ =
(8)
√σ
Da
and τ = aT . Since x∗ (T ) is a monotonic function of T and thus also of τ we can transform
this to the probability density that the voltage threshold is achieved at time T , namely
C1
λ2
−2τ
P (τ ) =
exp
(e
− 1) .
(9)
a cosh2 τ
4 cosh2 τ
In Eqs. (8) and (9) the constants C0 and C1 are set by the normalization condition.
We have now computed two of the three quantities needed to evaluate Eq. (5) for the
onset span S. Thus we are able to evaluate the first two terms of this equations. Our
theory has captured the probability distribution of the mean, but we also need to compute
the variance about this mean in order to fully evaluate Eq. (5) for S. We can calculate
this variance by noting that a general solution that satisfies x(0) = 0 and ẋ(T ) = σ can be
written as x = x∗ + δx, where δx can be expanded in the Fourier series
X
(n + 1/2)πt
δx =
bn sin
.
T
n
Substituting this into Eq. (6), we obtain
"
Z Y
T 2
b
P [x∗ + δx] = C2 P [x∗ ]
exp −
2D n
n≥0
π2
T2
!#
2
1
n+
+ a2
Dx,
2
(10)
where C2 is a normalization constant. This demonstrates that the total probability distribution is a product of the probability for the mean trajectory x∗ , with Gaussian probability
distributions for each of the bn s. Now, Eq. (10) shows that each bn has mean zero and
variance
Var(bn ) =
2
T ( Tπ 2 (n
7
D
.
+ 12 )2 + a2 )
Hence the variance of δx is given by
E(δx(T )2 ) =
DX
a n τ
π2
(n
τ2
1
D
≡ G(τ ),
1 2
a
+ 2) + 1
(11)
where we have again used the dimensionless parameters τ = aT and λ as defined above.
We now can evaluate Eq. 5 for S. Taking Eqs (7),(9) and (11) and letting H(τ ) = tanh τ
we have
#
" Z
Z
2 Z
D
λ2 H 2 (τ )Px (τ )dτ − λ H(τ )Px (τ )dτ + G(τ )Px (τ )dτ
S2 =
a
≡
D
F (λ).
a
(12)
(13)
The first two terms of Eq. (12) are the variance of the voltages reached by the mean path
x∗ (T ), for each time T at which the threshold might be reached. The last term adds in the
variance about the mean path for each value of T , that is the variability from δx. Equation
(12) is the central result of this paper, directly relating the onset span S to the noise strength
D, the voltage threshold σ and the onset rapidity a. Fig. 1 shows a numerical evaluation of
F (λ).
Asymptotic analysis of the integral in Eq. (12) shows that at small λ, F (λ) → 0.0629,
and at large λ, F (λ) ∼ λ2 /4 (Fig. 1). Hence we obtain
r
D
S → 0.2508
as λ → 0,
a
σ
S →
as λ → ∞.
2a
(14)
(15)
We note that the low λ limit describes the behavior of a simple random walk; here a small
value of λ corresponds to a low threshold for the derivative. Thus the variance of onset
voltages is simply the variance of all possible trajectories the random walk might take. In
the high λ limit the size of the noise term ceases to much affect the variance of onset voltages.
As the derivative threshold is high in this case, the deterministic exponential growth behavior
will dominate those trajectories that reach the threshold.
Thus we have calculated the variance of voltages at which action potential onset occurs
as a function of the onset rapidity a, the onset threshold σ and the level D of synaptic
background activity present. In figure 2a we have simulated a pair of trajectories with
parameter values a = 20ms−1 and D = 1mV2 ms−1 , and in figure 2d a pair with parameter
values a = 20ms−1 and D = 400mV2 ms−1 . To ascertain the onset potential of each simulated
8
20
15
log10(F)
10
5
0
−5
−5
0
5
10
log10(λ)
FIG. 1: Numerical evaluation of the function F (λ) as defined in Eq. (13).
trajectory we need to find the voltage at which the derivative of the trajectory first exceeds
the threshold. As the model in (4) is not differentiable, it is necessary to fit a ’smoothed’
curve to each trajectory, and find the derivative of this curve. In Figure 2b we have fitted
an exponential curve with equation Becx to each simulated trajectory. Figure 2c shows the
derivative extracted as a function of the voltage.
To demonstrate the validity of our analysis, we use the reduced Hodgkin Huxley model
described by (4) to simulate trajectories and compare the onset span we observe for particular
sets of parameter values with that predicted by our analysis. In order to simulate the
gaussian noise source η(t) in Eq. (4) we use a Wiener process with the appropriate diffusion
constant. In Figure 3 below we choose two sets of parameter values and compare the range
of onset potentials found by simulation with that predicted by our analysis. The black stars
are the points at which each trajectory crossed the derivative threshold. On each plot the
endpoints were grouped into bins of width 20dt. The average voltage in each bin is plotted in
9
5
5
0
20
d
Voltage (mV)
10
5
0
10
0
0.3
15
0
15
0.05 0.1
0.15
Time (ms)
0.2
0.1
0.2
Time (ms)
10
5
0
150
100
50
0
200
e
15
0
c
0
0.3
Derivative (mVms−1)
20
0.1
0.2
Time (ms)
Derivative (mVms−1)
10
0
200
b
15
0
Voltage (mV)
20
a
Voltage (mV)
Voltage (mV)
20
0.05
0.1
0.15
Time (ms)
0.2
5
10
15
Voltage (mV)
20
f
150
100
50
0
0
10
20
Voltage (mV)
FIG. 2: Pairs of trajectories simulated using (4) with a) onset rapidity a = 20ms−1 and noise
D = 1mVms−1 and d) a = 20ms−1 and D = 400mVms−1 . b,e) As described in the text, an
exponential curve was fit to each of the trajectories simulated. c,f) The calculated derivative of
the trajectories in a) and d) plotted as function of the voltage.
magenta, while the mean onset voltage at the center of each bin as predicted by our analysis
is plotted in red. Similarly the standard deviation about the mean in each bin is plotted
in cyan, and can be compared with the standard deviation predicted by our analysis which
has been plotted in green. We observe that both the mean onset potential and the standard
deviation about the mean at each time point found in the simulations is well matched by
that predicted by our analysis.
In both the low λ limit and the high λ limit we found in Eq. (14) that there is indeed an
antagonistic relationship between S and a, as argued by Naundorf et. al [2]. They observed
that changing the parameters of the activation curve and the peak sodium conductance
led to antagonistic changes in the onset rapidity and the onset span; hence they were not
able to fit the Hodgkin-Huxley model to their data. Equations (14) and (15) show that the
antagonistic relationship between S and a is controlled by D in the limit of low λ, and σ
10
8
8
b
7
7
6
6
5
5
Voltage (mV)
Voltage (mV)
a
4
4
3
3
2
2
1
1
0
0
0.1
0.2
0.3
Time (ms)
0.4
0
0.5
0
0.1
0.2
0.3
Time (ms)
0.4
0.5
FIG. 3: Trajectories (10000) were simulated as in 2 with the following sets of parameter values: a)
σ = 25 mVms−1 , D = 1 mV2 ms−1 and a = 10 ms−1 , b) σ = 50 mVms−1 , D = 25 mV2 ms−1 and
a = 10 ms−1 . On each plot the endpoints were grouped into bins of width 20dt. The average voltage
in each bin is plotted in magenta, this should be compared with the most likely onset voltage at
each time point according to our analysis, plotted in red. Similarly the standard deviation in each
bin is plotted in cyan, and can be compared with the standard deviation predicted by our analysis
at each time point, plotted in green.
in the limit of high λ. Neither D (the variance of the synaptic noise strength) nor σ (the
criterion for the voltage threshold) were varied in the simulations of Naundorf et. al [2]. We
observe that our analysis can also be applied to the cooperative model proposed in [2] in
which the probability of channel opening depends on both the membrane voltage and the
local channel density. In the vicinity of the unstable fixed point, incorporating the local
channel density alters the value of a, but does not change the form of equation (4).
We now compare the theory to the results of Naundorf. In their experiments, they mea-
11
20
D = 25(mV2ms−1)
18
D = 100(mV2ms−1)
D = 400(mV2ms−1)
16
D = 900(mV2ms−1)
Simulation data
Regular spiking
Fast rhythmic bursting
Fast spiking
14
12
10
8
6
4
2
0
10
20
30
40
50
60
70
80
90
100
FIG. 4: Here the solid blue dots are the simulation data points reported in [2], while the solid
red, yellow and green dots are the experimental data points from [2] for cat visual cortex neurons
classified electrophysiologically as regular spiking, fast rhythmic bursting, and fast spiking respectively. Data from many cells of each type is displayed in this plot. The curves show our analytical
results for various values of the parameter D.
sure the onset span as the difference between the maximum and minimum voltage threshold
that is measured. Since 99.7% of observations fall within three standard deviations of the
mean, we can approximate the onset span of between 50 and 500 trials as six times the standard deviation S. We assume that the calculation of the onset span from the simulations in
Naundorf was done in the same fashion.
In Figure 4 we have calculated the onset span as a function of a using different values of
D. Changing the noise strength allows the theoretical curves to move between the various
regimes observed experimentally. For most of the curves through the experimental data,
a noise diffusion constant D = 25 − 100mV2 ms−1 fits the data well. Although this is a
larger diffusion constant than that apparently used in the simulations of Naundorf et. al,
this value does a good job of emulating the experimental trajectories shown in Figures 2b
12
and 2d of [2]. Figure 2d shows a simulated trajectory for noise strength D = 400 mV2 ms−1
while Fig 2a shows a simulation with a smaller diffusion coefficient of D = 1 mV2 ms−1 . The
voltage trace at D = 400 is visually similar to the behavior in Figure 2b of Naundorf in the
vicinity of the unstable fixed point, whereas the noise level in Figure 2a is much too low.
Note that because we have linearized around the unstable fixed point, we only can expect to
capture the behavior around the voltage threshold; this is presumably the reason that our
simulations in Fig 2 do not reproduce the vertical spiking behavior occurring after action
potential onset in Figure 2b of [2]..
It is worth noting that additional sources of variance exist when comparing the experiments to the theory. In particular, (i) the theory assumes that the voltage threshold occurs
precisely when dV /dt = σ(= 10mV /ms); in contrast the experiments show substantial variability in σ. Additionally (ii) experiments report an averaged onset rapidity, whereas our
analysis indicates a direct relationship between the onset potential and a. Both of these
factors (i) and (ii) artificially increase the onset span.
The calculations described here make clear that to understand whether the experimental
data is consistent with the Hodgkin Huxley picture, it is necessary to understand the corresponding level of D; ideally, independent measurements of the synaptic background statistics
are required. Intense levels of background activity characterized by high amplitude membrane potential fluctuations are known to occur during active states in neocortical neurons
[11]. Combining the theoretical formalism described herein with measurements of the variance of synaptic conductances [12], carefully controlling for other sources of variability in
the measurement, is an excellent direction for future research.
In order to compare the data in [2] with simulations of the Hodgkin-Huxley model, independent measurements of the synaptic background statistics are thus required. Intense
levels of background activity characterized by high-amplitude membrane potential fluctuations are known to occur during active states in neocortical neurons [11]. Indeed methods
have been proposed for the estimation of the variance of synaptic conductances from membrane potential fluctuations [12]. We conclude that this theoretical formulation might prove
useful for future analysis of experimental data such as that presented in [2].
13
E.
Acknowledgements
This research was supported by the NSF Division of Mathematical Sciences. The writing
of the paper was done in part at the Kavli Institute for Theoretical Physics, also supported
by NSF.
F.
References
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14
tic conductances from membrane potential fluctuations. J Neurophysio 91: 2884-2896.
G.
Figure Legends
Fig 1: Numerical evalution of the function F (λ) as defined in (13) above.
Fig 2: Pairs of trajectories simulated using (4) with a) onset rapidity a = 20ms−1 and
noise D = 1mVms−1 and d) a = 20ms−1 and D = 400mVms−1 . b,e) As described in the
text, an exponential curve was fit to each of the trajectories simulated. c,f) The calculated
derivative of the trajectories in a) and c) plotted as function of the voltage.
Fig 3:Trajectories (10000) were simulated as in 2 with the following sets of parameter
values: a) σ = 25 mVms−1 , D = 1 mV2 ms−1 and a = 10 ms−1 , b) σ = 50 mVms−1 , D = 25
mV2 ms−1 and a = 10 ms−1 . On each plot the endpoints were grouped into bins of width
20dt. The average voltage in each bin is plotted in magenta, this should be compared with
the most likely onset voltage at each time point according to our analysis, plotted in red.
Similarly the standard deviation in each bin is plotted in cyan, and can be compared with
the standard deviation predicted by our analysis at each time point, plotted in green.
Fig 4: Here the solid blue dots are the simulation data points reported in [2], while the
solid red, yellow and green dots are the experimental data points from [2] for cat visual
cortex neurons classified electrophysiologically as regular spiking, fast rhythmic bursting,
and fast spiking respectively. Data from many cells of each type is displayed in this plot.
The curves show our analytical results for various values of the parameter D.
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